import java.io.*;
import java.math.BigInteger;
import java.util.Arrays;
import java.util.StringTokenizer;

public class Main {

    FastScanner in = new FastScanner(System.in);
    PrintWriter out = new PrintWriter(System.out);

    public static void main (String[]args) {
        Main task = new Main();
        task.solve();
        task.close();
    }

    public void close () {
        in.close();
        out.close();
    }

    public void solve () {


    }
    

}

class Algebra {
    /****
     *       Number of co-prime numbers on [1, n].
     *       Number a is Co-prime if gcd (a, n) == 1
     *       O (sqrt(n))
     ****/
    public static int phi(int n) {
        int result = n;
        for (int i = 2; i*i <= n; ++i) {
            if (n % i == 0) {
                while (n % i == 0) {
                    n /= i;
                }
                result -= result / i;
            }
        }
        if (n > 1) {
            result -= result / n;
        }
        return result;
    }

    /****
     *       Raise number a to power of n.
     *       O (log n)
     ****/
    public static int binpow (int a, int n) {
        int res = 1;
        while (n != 0) {
            if ((n & 1) == 1)
                res *= a;
            a *= a;
            n >>= 1;
        }
        return res;
    }

    /****
     *       Finding the greatest common divisor of two numbers.
     *       O (log min(a, b))
     ****/
    public static int gcd (int a, int b) {
        return (b != 0) ? gcd (b, a % b) : a;
    }

    /****
     *       Finding the lowest common multiple of two numbers.
     *       O (log min(a, b))
     ****/
    public static int lcm (int a, int b) {
        return a / gcd (a, b) * b;
    }

    /****
     *       Eratosthenes Sieve of numbers - [0..n]. True - simple, False - not simple.
     *       O (n log log n)
     ****/
    public static boolean[] sieveOfEratosthenes (int n) {
        boolean [] prime = new boolean[n + 1];
        Arrays.fill(prime, true);
        prime[0] = prime[1] = false;
        for (int i=2; i<=n; ++i) {
            if (prime[i]) {
                if (i * 1L * i <= n) {
                    for (int j=i*i; j<=n; j+=i) {
                        prime[j] = false;
                    }
                }
            }
        }
        return prime;
    }
}

class FastScanner {
    BufferedReader br;
    StringTokenizer st;

    FastScanner(InputStream in) {
        br = new BufferedReader(new InputStreamReader(in));
    }
    
    String next() {
        while (st == null || !st.hasMoreTokens()) {
            try {
                st = new StringTokenizer(br.readLine());
            } catch (IOException e) {
                System.err.println(e);
                return "";
            }
        }
        return st.nextToken();
    }

    int nextInt() {
        return Integer.parseInt(next());
    }

    long nextLong() {
        return Long.parseLong(next());
    }

    double nextDouble() {
        return Double.parseDouble(next());
    }

    float nextFloat() {
        return Float.parseFloat(next());
    }
    BigInteger nextBigInt() {
        return new BigInteger(next());
    }

    void close() {
        try {
            br.close();
        }
        catch (IOException e) {
        }
    }
}
